The rule RO, 90° • T-1, 1(x, y) is applied to ΔBCD to produce ΔB"C"D". Point B" of the final image is at (–4, 1).

What are the coordinates of point B on the pre-image?

A) (–2, –5)
B) (0, –5)
C) (2, 3)
D) (5, 0)

The coordinates of point B on the pre-image is (2, 3) :

RO, 90°
Original coordinates: (2 , 3)
Angle of roration 90
x-new = x*cos( θ )-ysin( θ ) , θ = 90
= 2cos(90) - 3sin(90)
x-new = (2)(0)-(3)(1) = -3
y-new = x*sins( θ)+ycos( θ ) , θ = 90
= 2sin(90) + 3cos(90)
y-new = (2)(1)+(3)(0) = 2
Coordinates after rotation (-3,2)

T-1
(-3,-1,2-1)
(-4,1)

1(-4,1) = (-4,1)

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Аноним Аноним · Answer 2 · 2017-03-31T20:59:00+02:00

Аноним Аноним

31-03-2017

The rule RO, 90° • T-1, 1(x, y) is applied to ΔBCD to produce ΔB"C"D" means that it starts with T-1, 1(x, y) and ends with RO, 90° (counter-clockwise).

Working backward, we have

RO, -90° (clockwise) which gives

(-4,1) => (1,4)

then reverse T-1, 1(x, y), which is T1, -1(x, y):

(1,4) => (2,3)

so ans is C

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The rule RO, 90° • T-1, 1(x, y) is applied to ΔBCD to produce ΔB"C"D". Point B" of the final image is at (–4, 1). What are the coordinates of point B on the pre-image? A) (–2, –5) B) (0, –5) C) (2, 3) D) (5, 0)

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The rule RO, 90° • T-1, 1(x, y) is applied to ΔBCD to produce ΔB"C"D". Point B" of the final image is at (–4, 1).

What are the coordinates of point B on the pre-image?

A) (–2, –5)
B) (0, –5)
C) (2, 3)
D) (5, 0)